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  1. Slow consistency.Sy-David Friedman, Michael Rathjen & Andreas Weiermann - 2013 - Annals of Pure and Applied Logic 164 (3):382-393.
    The fact that “natural” theories, i.e. theories which have something like an “idea” to them, are almost always linearly ordered with regard to logical strength has been called one of the great mysteries of the foundation of mathematics. However, one easily establishes the existence of theories with incomparable logical strengths using self-reference . As a result, PA+Con is not the least theory whose strength is greater than that of PA. But still we can ask: is there a sense in which (...)
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  • Investigations on slow versus fast growing: How to majorize slow growing functions nontrivially by fast growing ones. [REVIEW]Andreas Weiermann - 1995 - Archive for Mathematical Logic 34 (5):313-330.
    Let T(Ω) be the ordinal notation system from Buchholz-Schütte (1988). [The order type of the countable segmentT(Ω)0 is — by Rathjen (1988) — the proof-theoretic ordinal the proof-theoretic ordinal ofACA 0 + (Π 1 l −TR).] In particular let ↦Ω a denote the enumeration function of the infinite cardinals and leta ↦ ψ0 a denote the partial collapsing operation on T(Ω) which maps ordinals of T(Ω) into the countable segment TΩ 0 of T(Ω). Assume that the (fast growing) extended Grzegorczyk (...)
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  • Term rewriting theory for the primitive recursive functions.E. A. Cichon & Andreas Weiermann - 1997 - Annals of Pure and Applied Logic 83 (3):199-223.
    The termination of rewrite systems for parameter recursion, simple nested recursion and unnested multiple recursion is shown by using monotone interpretations both on the ordinals below the first primitive recursively closed ordinal and on the natural numbers. We show that the resulting derivation lengths are primitive recursive. As a corollary we obtain transparent and illuminating proofs of the facts that the schemata of parameter recursion, simple nested recursion and unnested multiple recursion lead from primitive recursive functions to primitive recursive functions.
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  • Open questions in reverse mathematics.Antonio Montalbán - 2011 - Bulletin of Symbolic Logic 17 (3):431-454.
    We present a list of open questions in reverse mathematics, including some relevant background information for each question. We also mention some of the areas of reverse mathematics that are starting to be developed and where interesting open question may be found.
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  • Normal functors, power series and lambda-calculus.Jean-Yves Girard - 1988 - Annals of Pure and Applied Logic 37 (2):129.
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  • Inductive definitions over a predicative arithmetic.Stanley S. Wainer & Richard S. Williams - 2005 - Annals of Pure and Applied Logic 136 (1-2):175-188.
    Girard’s maxim, that Peano Arithmetic is a theory of one inductive definition, is re-examined in the light of a weak theory EA formalising basic principles of Nelson’s predicative Arithmetic.
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  • Slow growing versus fast growing.S. S. Wainer - 1989 - Journal of Symbolic Logic 54 (2):608-614.
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  • Accessible recursive functions.Stanley S. Wainer - 1999 - Bulletin of Symbolic Logic 5 (3):367-388.
    The class of all recursive functions fails to possess a natural hierarchical structure, generated predicatively from "within". On the other hand, many (proof-theoretically significant) sub-recursive classes do. This paper attempts to measure the limit of predicative generation in this context, by classifying and characterizing those (predictably terminating) recursive functions which can be successively defined according to an autonomy condition of the form: allow recursions only over well-orderings which have already been "coded" at previous levels. The question is: how can a (...)
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  • Bachmann–Howard derivatives.Anton Freund - 2023 - Archive for Mathematical Logic 62 (5):581-618.
    It is generally accepted that H. Friedman’s gap condition is closely related to iterated collapsing functions from ordinal analysis. But what precisely is the connection? We offer the following answer: In a previous paper we have shown that the gap condition arises from an iterative construction on transformations of partial orders. Here we show that the parallel construction for linear orders yields familiar collapsing functions. The iteration step in the linear case is an instance of a general construction that we (...)
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  • Boundedness theorems for dilators and ptykes.Alexander Kechris - 1991 - Annals of Pure and Applied Logic 52 (1-2):79-92.
    The main theorem of this paper is: If ƒ is a partial function from 1 to 1 which is ∑11-bounded, then there is a weakly finite primitive recursive dilatorD such that for all infinite αεdom, ƒ D. The proof involves only elementary combinatorial constructions of trees. A generalization to ptykes is also given.
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  • A functorial property of the Aczel-Buchholz-Feferman function.Andreas Weiermann - 1994 - Journal of Symbolic Logic 59 (3):945-955.
    Let Ω be the least uncountable ordinal. Let K(Ω) be the category where the objects are the countable ordinals and where the morphisms are the strictly monotonic increasing functions. A dilator is a functor on K(Ω) which preserves direct limits and pullbacks. Let $\tau \Omega: \xi = \omega^\xi\}$ . Then τ has a unique "term"-representation in Ω. λξη.ω ξ + η and countable ordinals called the constituents of τ. Let $\delta and K(τ) be the set of the constituents of τ. (...)
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  • Functors and ordinal notations. I: A functorial construction of the veblen hierarchy.Jean-Yves Girard & Jacqueline Vauzeilles - 1984 - Journal of Symbolic Logic 49 (3):713-729.
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  • Reducing omega-model reflection to iterated syntactic reflection.Fedor Pakhomov & James Walsh - 2021 - Journal of Mathematical Logic 23 (2).
    Journal of Mathematical Logic, Volume 23, Issue 02, August 2023. In mathematical logic there are two seemingly distinct kinds of principles called “reflection principles.” Semantic reflection principles assert that if a formula holds in the whole universe, then it holds in a set-sized model. Syntactic reflection principles assert that every provable sentence from some complexity class is true. In this paper, we study connections between these two kinds of reflection principles in the setting of second-order arithmetic. We prove that, for (...)
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  • Recursion on Homogeneous Trees.Herman Ruge Jervell - 1985 - Mathematical Logic Quarterly 31 (19-20):295-298.
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  • Functors and Ordinal Notations. II: A Functorial Construction of the Bachmann Hierarchy.Jean-Yves Girard & Jacqueline Vauzeilles - 1984 - Journal of Symbolic Logic 49 (4):1079 - 1114.
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  • What's so special about Kruskal's theorem and the ordinal Γo? A survey of some results in proof theory.Jean H. Gallier - 1991 - Annals of Pure and Applied Logic 53 (3):199-260.
    This paper consists primarily of a survey of results of Harvey Friedman about some proof-theoretic aspects of various forms of Kruskal's tree theorem, and in particular the connection with the ordinal Γ0. We also include a fairly extensive treatment of normal functions on the countable ordinals, and we give a glimpse of Verlen hierarchies, some subsystems of second-order logic, slow-growing and fast-growing hierarchies including Girard's result, and Goodstein sequences. The central theme of this paper is a powerful theorem due to (...)
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  • Set recursion and [product]¹2-logic.J. Girard - 1985 - Annals of Pure and Applied Logic 28 (3):255.
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  • What's so special about Kruskal's theorem and the ordinal Γo? A survey of some results in proof theory.Jean Gallier - 1991 - Annals of Pure and Applied Logic 53 (3):199-260.
    This paper consists primarily of a survey of results of Harvey Friedman about some proof-theoretic aspects of various forms of Kruskal's tree theorem, and in particular the connection with the ordinal Γ0. We also include a fairly extensive treatment of normal functions on the countable ordinals, and we give a glimpse of Verlen hierarchies, some subsystems of second-order logic, slow-growing and fast-growing hierarchies including Girard's result, and Goodstein sequences. The central theme of this paper is a powerful theorem due to (...)
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  • Rekursion über Dilatoren und die Bachmann-Hierarchie.Peter Päppinghaus - 1989 - Archive for Mathematical Logic 28 (1):57-73.
    A hierarchy (J D g ) D Dilator of ordinal functionsJ D g : On→On is introduced and studied. It is a hierarchy of iterations relative to some giveng:OnarOn, defined by primitive recursion on dilators. This hierarchy is related to a Bachmann hierarchy $\left( {\phi _\alpha ^g } \right)_{\alpha< \varepsilon _{\Omega {\mathbf{ }} + {\mathbf{ }}1} }$ , which is built on an iteration ofg ↑ Ω as initial function.This Bachmann hierarchy $\left( {\phi _\alpha ^g } \right)_{\alpha< \varepsilon _{\Omega {\mathbf{ (...)
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  • Intuitionistic sets and ordinals.Paul Taylor - 1996 - Journal of Symbolic Logic 61 (3):705-744.
    Transitive extensional well founded relations provide an intuitionistic notion of ordinals which admits transfinite induction. However these ordinals are not directed and their successor operation is poorly behaved, leading to problems of functoriality. We show how to make the successor monotone by introducing plumpness, which strengthens transitivity. This clarifies the traditional development of successors and unions, making it intuitionistic; even the (classical) proof of trichotomy is made simpler. The definition is, however, recursive, and, as their name suggests, the plump ordinals (...)
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  • A proof-theoretical analysis of ptykes.J. R. G. Catlow - 1994 - Archive for Mathematical Logic 33 (1):57-79.
    The notion of a “ptyx” is formalised in second-order arithmetic, and, using proof-theoretic techniques based on sequent-calculus, bounds are obtained for the ptykes of type 1 and 2 which can be proved to be ptykes using arithmetic comprehension.
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  • Rungs and trees.Marcel Masseron - 1983 - Journal of Symbolic Logic 48 (3):847-863.
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  • Large cardinals and large dilators.Andy Lewis - 1998 - Journal of Symbolic Logic 63 (4):1496-1510.
    Applying Woodin's non-stationary tower notion of forcing, I prove that the existence of a supercompact cardinal κ in V and a Ramsey dilator in some small forcing extension V[G] implies the existence in V of a measurable dilator of size κ, measurable by κ-complete measures.
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  • (1 other version)How is it that infinitary methods can be applied to finitary mathematics? Gödel's T: a case study.Andreas Weiermann - 1998 - Journal of Symbolic Logic 63 (4):1348-1370.
    Inspired by Pohlers' local predicativity approach to Pure Proof Theory and Howard's ordinal analysis of bar recursion of type zero we present a short, technically smooth and constructive strong normalization proof for Gödel's system T of primitive recursive functionals of finite types by constructing an ε 0 -recursive function [] 0 : T → ω so that a reduces to b implies [a] $_0 > [b]_0$ . The construction of [] 0 is based on a careful analysis of the Howard-Schütte (...)
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  • The slow-growing and the grzecorczyk hierarchies.E. A. Cichon & S. S. Wainer - 1983 - Journal of Symbolic Logic 48 (2):399-408.
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  • Embeddability of ptykes.Jean-Yves Girard & Dag Normann - 1992 - Journal of Symbolic Logic 57 (2):659-676.
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  • Π 2 1 -Logic and uniformization in the analytical hierarchy.J. P. Ressayre - 1989 - Archive for Mathematical Logic 28 (2):99-117.
    We give a simple proof ofΠ 1 1 andΠ 2 1 uniformization results, which is based on the use ofΠ 2 1 -Logic.
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  • Working foundations.Solomon Feferman - 1985 - Synthese 62 (2):229 - 254.
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  • Equational derivation vs. computation.W. G. Handley & S. S. Wainer - 1994 - Annals of Pure and Applied Logic 70 (1):17-49.
    Subrecursive hierarchy classifications are used to compare the complexities of recursive functions according to their derivations in a version of Kleene's equation calculus, and their computations by term-rewriting. In each case ordinal bounds are assigned, and it turns out that the respective complexity measures are given by a version of the Fast Growing Hierarchy, and the Slow Growing Hierarchy. Known comparisons between the two hierarchies then provide ordinal trade-offs between derivation and computation. Characteristics of some well-known subrecursive classes are also (...)
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  • Another extension of Van de Wiele's theorem.Robert S. Lubarsky - 1988 - Annals of Pure and Applied Logic 38 (3):301-306.
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  • (1 other version)Some Uses of Dilators in Combinatorial Problems. II.V. Michele Abrusci, Jean-Yves Girard & Jacques van de Wiele - 1990 - Journal of Symbolic Logic 55 (1):32 - 40.
    We study increasing F-sequences, where F is a dilator: an increasing F-sequence is a sequence (indexed by ordinal numbers) of ordinal numbers, starting with 0 and terminating at the first step x where F(x) is reached (at every step x + 1 we use the same process as in decreasing F-sequences, cf. [2], but with "+ 1" instead of "- 1"). By induction on dilators, we shall prove that every increasing F-sequence terminates and moreover we can determine for every dilator (...)
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  • A strong boundedness theorem for dilators.A. S. Kechris & W. H. Woodin - 1991 - Annals of Pure and Applied Logic 52 (1-2):93-97.
    We prove a strong boundedness theorem for dilators: if A ⊆ DIL is Σ 1 1 , then there is a recursive dilator D 0 such that ∀ D ∈ A.
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  • Set recursion and Πhalf-logic.Jean-Yves Girard & Dag Normann - 1985 - Annals of Pure and Applied Logic 28 (3):255-286.
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  • Pure Σ2-elementarity beyond the core.Gunnar Wilken - 2021 - Annals of Pure and Applied Logic 172 (9):103001.
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  • (1 other version)Some uses of dilators in combinatorial problems.V. Michele Abrusci - 1989 - Archive for Mathematical Logic 29 (2):85-109.
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  • Analytic combinatorics, proof-theoretic ordinals, and phase transitions for independence results.Andreas Weiermann - 2005 - Annals of Pure and Applied Logic 136 (1):189-218.
    This paper is intended to give for a general mathematical audience a survey of intriguing connections between analytic combinatorics and logic. We define the ordinals below ε0 in non-logical terms and we survey a selection of recent results about the analytic combinatorics of these ordinals. Using a versatile and flexible compression technique we give applications to phase transitions for independence results, Hilbert’s basis theorem, local number theory, Ramsey theory, Hydra games, and Goodstein sequences. We discuss briefly universality and renormalization issues (...)
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  • (1 other version)Meeting of the Association for Symbolic Logic, Marseilles, 1981.J. Stern - 1983 - Journal of Symbolic Logic 48 (4):1210-1232.
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  • Boundedness theorems for dilators and ptykes.Alexander S. Kechris - 1991 - Annals of Pure and Applied Logic 52 (1-2):79-92.
    The main theorem of this paper is: If ƒ is a partial function from ℵ 1 to ℵ 1 which is ∑ 1 1 -bounded, then there is a weakly finite primitive recursive dilator D such that for all infinite αϵdom , ƒ ⩽ D . The proof involves only elementary combinatorial constructions of trees. A generalization to ptykes is also given.
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  • Interpreting higher computations as types with totality.L. Kristiansen & D. Normann - 1994 - Archive for Mathematical Logic 33 (4):243-259.
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  • Downey, R., Gasarch, W. and Moses, M., The structure.S. D. Friedman, W. G. Handley, S. S. Wainer, A. Joyal, I. Moerdijk, L. Newelski, F. van Engelen & J. van Oosten - 1994 - Annals of Pure and Applied Logic 70 (1):287.
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  • Equalization of finite flowers.Stefano Berardi - 1988 - Journal of Symbolic Logic 53 (1):105-123.
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